Title :
Linear Operators on Hyperbola and Hyperboloid
Author :
Lee, Moon Ho ; Chen, Zhu
Author_Institution :
Chonbuk Nat. Univ., Jeonju
Abstract :
Jacket matrices which are defined to be mtimesm matrices J = [jik] over a field F with the property JJdagger = mIm, J is the transpose matrix of elements inverse of J. i.e., Jdagger = [jik -1]T, was introduced by Lee in 1984 and are used for digital signal processing and coding theory. This paper presents some square matrices A2n which can be eigenvalue decomposed by Jacket matrices. Specially, A2 and its extension A3 can be used for modifying the properties of hyperbola and hyperboloid, respectively. The ideas that we will develop here have applications in computer graphics and used in many important numerical algorithms.
Keywords :
eigenvalues and eigenfunctions; hyperbolic equations; matrix decomposition; matrix inversion; signal processing; Jacket matrices; coding theory; computer graphics; digital signal processing; eigenvalue decomposition; hyperbola; hyperboloid; linear operators; matrix diagonalization; transpose inverse matrix; Cryptography; Digital signal processing; Eigenvalues and eigenfunctions; Error correction; Error correction codes; Geometry; Matrix decomposition; Mobile communication; Moon; Signal processing; Center Weighed Hadamard; Diagonalization; Eigenvalue decomposition; Jacket matrix;
Conference_Titel :
Systems and Networks Communications, 2007. ICSNC 2007. Second International Conference on
Conference_Location :
Cap Esterel
Print_ISBN :
0-7695-2938-0
Electronic_ISBN :
978-0-7695-2938-7
DOI :
10.1109/ICSNC.2007.49
